A Remark on the Arcsine Distribution and the Hilbert Transform

Abstract

It is known that if (pn)n ∈ N is a sequence of orthogonal polynomials in L2([-1,1], w(x)dx), then the roots are distributed according to an arcsine distribution π-1 (1-x2)-1dx for a wide variety of weights w(x). We connect this to a result of the Hilbert transform due to Tricomi: if f(x)(1-x2)1/4 ∈ L2(-1,1) and its Hilbert transform Hf vanishes on (-1,1), then the function f is a multiple of the arcsine distribution f(x) = c1-x2(-1,1) where~c~∈ R. We also prove a localized Parseval-type identity that seems to be new: if f(x)(1-x2)1/4 ∈ L2(-1,1) and f(x) 1-x2 has mean value 0 on (-1,1), then ∫-11 (Hf)(x)2 1-x2 dx = ∫-11 f(x)2 1-x2 dx.